<TeXmacs|2.1.1>

<style|<tuple|book|chinese>>

<\body>
  <doc-data|<doc-title|\<#6570\>\<#5B66\>\<#5206\>\<#6790\>\<#540D\>\<#5E08\>\<#5BFC\>\<#5B66\>>>

  <\table-of-contents|toc>
    \;
  </table-of-contents>

  \;

  <chapter|\<#5B9E\>\<#6570\>\<#96C6\>\<#4E0E\>\<#51FD\>\<#6570\>>

  <section|\<#5B9E\>\<#6570\>>

  <\example>
    \<#4F2F\>\<#52AA\>\<#529B\>(Bernoulli)\<#4E0D\>\<#7B49\>\<#5F0F\>\<#FF0C\>\<#8BBE\>
    <math|h\<gtr\>-1>, <math|n\<in\>N<rsup|+>>, <math|n\<geqslant\>2>,
    \<#5219\>\<#6210\>\<#7ACB\>

    <\equation*>
      <around*|(|1+h|)><rsup|n>\<geqslant\>1+n h
    </equation*>
  </example>

  <\proof>
    \<#6570\>\<#5B66\>\<#5F52\>\<#7EB3\>\<#6CD5\>. \<#7565\>.
  </proof>

  <\proof>
    \<#7531\>\<#4E58\>\<#6CD5\>\<#516C\>\<#5F0F\>\<#FF0C\>\<#6709\>
    <math|<around*|(|1+h|)><rsup|n>-1=h<around*|[|<around*|(|1+h|)><rsup|n-1>+<around*|(|1+h|)><rsup|n-2>+\<cdots\>+1|]>>,
    \<#82E5\> <math|h\<geqslant\>0>\<#FF0C\>\<#7ED3\>\<#8BBA\>\<#663E\>\<#7136\>\<#FF0C\>\<#6B64\>\<#5904\>\<#53EA\>\<#8BA8\>\<#8BBA\>
    <math|-1\<less\>h\<less\>0> \<#7684\>\<#60C5\>\<#51B5\>\<#FF0C\>\<#6B64\>\<#65F6\>\<#663E\>\<#7136\>\<#6709\>
    <math|<around*|(|1+h|)><rsup|n-1>+<around*|(|1+h|)><rsup|n-2>+\<cdots\>+1\<less\>n>\<#FF0C\>\<#6545\>\<#4E0D\>\<#7B49\>\<#5F0F\>\<#6210\>\<#7ACB\>.
  </proof>

  <\proof>
    \<#7531\>\<#4E8C\>\<#9879\>\<#5F0F\>\<#5B9A\>\<#7406\>\<#FF0C\>\<#53EA\>\<#9700\>\<#8BC1\>\<#660E\>
    <math|C<rsub|n><rsup|2>h<rsup|2>+C<rsub|n><rsup|3>h<rsup|3>+\<cdots\>+C<rsub|n><rsup|n>h<rsup|n>\<geqslant\>0>.
    <math|h\<geqslant\>0> \<#65F6\>\<#8FD9\>\<#662F\>\<#663E\>\<#7136\>\<#6210\>\<#7ACB\>\<#7684\>\<#FF0C\>\<#5728\>
    <math|-1\<less\>h\<less\>0> \<#65F6\>,
  </proof>

  <\example>
    \<#8BBE\> <math|x<rsub|1>,x<rsub|2>,\<ldots\>,x<rsub|n>> \<#4E3A\>
    <math|n<around*|(|\<geqslant\>2|)>> \<#4E2A\>\<#975E\>\<#8D1F\>\<#5B9E\>\<#6570\>\<#FF0C\>\<#5219\>\<#4E0B\>\<#5F0F\>\<#6210\>\<#7ACB\>

    <\equation*>
      <around*|(|x<rsub|1>x<rsub|2>\<cdots\>x<rsub|n>|)><rsup|<frac|1|n>>\<leqslant\><frac|1|n><around*|(|x<rsub|1>+x<rsub|2>+\<cdots\>x<rsub|n>|)>
    </equation*>
  </example>

  <\proof>
    \<#6570\>\<#5B66\>\<#5F52\>\<#7EB3\>\<#6CD5\>\<#FF0C\><math|n=2>
    \<#65F6\>\<#6709\> <math|<frac|1|2><around*|(|x<rsub|1>+x<rsub|2>|)>-<sqrt|x<rsub|1>x<rsub|2>>=<frac|1|2><around*|(|<sqrt|x<rsub|1>>-<sqrt|x<rsub|2>>|)><rsup|2>\<geqslant\>0>.
    \<#5982\>\<#82E5\>\<#4E0D\>\<#7B49\>\<#5F0F\>\<#5BF9\> <math|n>
    \<#4E2A\>\<#6570\>\<#7684\>\<#60C5\>\<#5F62\>\<#662F\>\<#6210\>\<#7ACB\>\<#7684\>\<#FF0C\>\<#5219\>\<#5BF9\>\<#4E8E\>
    <math|2n> \<#4E2A\>\<#6570\>\<#4E5F\>\<#5FC5\>\<#7136\>\<#6210\>\<#7ACB\>\<#FF0C\>\<#8FD9\>\<#662F\>\<#56E0\>\<#4E3A\>

    <\eqnarray*>
      <tformat|<table|<row|<cell|<around*|(|x<rsub|1>x<rsub|2>\<cdots\>x<rsub|2n>|)><rsup|<frac|1|2n>>>|<cell|=>|<cell|<sqrt|<around*|(|x<rsub|1>x<rsub|2>\<cdots\>x<rsub|n>|)><rsup|<frac|1|n>><around*|(|x<rsub|n+1>x<rsub|n+2>\<cdots\>x<rsub|2n>|)><rsup|<frac|1|n>>>>>|<row|<cell|>|<cell|\<leqslant\>>|<cell|<sqrt|<frac|x<rsub|1>+x<rsub|2>+\<cdots\>x<rsub|n>|n>\<cdot\><frac|x<rsub|n+1>+x<rsub|n+2>+\<cdots\>+x<rsub|2n>|n>>>>|<row|<cell|>|<cell|\<leqslant\>>|<cell|<frac|1|2><around*|(|<frac|x<rsub|1>+x<rsub|2>+\<cdots\>x<rsub|n>|n>+<frac|x<rsub|n+1>+x<rsub|n+2>+\<cdots\>+x<rsub|2n>|n>|)>>>|<row|<cell|>|<cell|=>|<cell|<frac|1|2n><around*|(|x<rsub|1>+x<rsub|2>+\<cdots\>+x<rsub|2n>|)>>>>>
    </eqnarray*>

    \<#4E8E\>\<#662F\>\<#4E0D\>\<#7B49\>\<#5F0F\>\<#5BF9\>\<#4E8E\>\<#5F62\>\<#5982\>
    <math|n=2<rsup|m><around*|(|m\<in\>N<rsup|+>|)>>
    \<#7684\>\<#6B63\>\<#6574\>\<#6570\> <math|n>
    \<#5C31\>\<#90FD\>\<#6210\>\<#7ACB\>.
    \<#518D\>\<#91C7\>\<#7528\>\<#5012\>\<#63A8\>\<#7684\>\<#529E\>\<#6CD5\>\<#FF0C\>\<#5047\>\<#5982\>\<#4E0D\>\<#7B49\>\<#5F0F\>\<#5BF9\>\<#4E8E\>
    <math|n+1> \<#4E2A\>\<#6570\>\<#7684\>\<#60C5\>\<#5F62\>\<#6210\>\<#7ACB\>\<#FF0C\>\<#6211\>\<#4EEC\>\<#6765\>\<#8BC1\>\<#660E\>\<#5B83\>\<#5BF9\>\<#4E8E\>
    <math|n> \<#4E2A\>\<#6570\>\<#4E5F\>\<#5FC5\>\<#7136\>\<#6210\>\<#7ACB\>\<#FF0C\>\<#5BF9\>\<#4E8E\>
    <math|n> \<#4E2A\>\<#6570\>\<#7684\>\<#60C5\>\<#5F62\>\<#FF0C\>\<#6211\>\<#4EEC\>\<#6784\>\<#9020\>\<#7B2C\>
    <math|n+1> \<#4E2A\>\<#6570\> <math|x<rsub|n+1>=<frac|1|n><around*|(|x<rsub|1>+x<rsub|2>+\<cdots\>x<rsub|n>|)>>\<#FF0C\>\<#5219\>\<#6709\>

    <\eqnarray*>
      <tformat|<table|<row|<cell|<frac|1|n+1><around*|(|x<rsub|1>+x<rsub|2>+\<cdots\>+x<rsub|n>+x<rsub|n+1>|)>>|<cell|\<geqslant\>>|<cell|<around*|(|x<rsub|1>x<rsub|2>\<cdots\>x<rsub|n>x<rsub|n+1>|)><rsup|<frac|1|n+1>>>>|<row|<cell|>|<cell|=>|<cell|<around*|(|x<rsub|1>x<rsub|2>\<cdots\>x<rsub|n>\<cdot\><frac|x<rsub|1>+x<rsub|2>+\<cdots\>+x<rsub|n>|n>|)><rsup|<frac|1|n+1>>>>>>
    </eqnarray*>

    \<#7531\>\<#4E8E\> <math|x<rsub|n+1>=<frac|1|n><around*|(|x<rsub|1>+x<rsub|2>+\<cdots\>x<rsub|n>|)>>,
    \<#56E0\>\<#6B64\>\<#4E0A\>\<#5F0F\>\<#7684\>\<#5DE6\>\<#8FB9\>\<#4E5F\>\<#7B49\>\<#4E8E\>
    <math|<frac|1|n><around*|(|x<rsub|1>+x<rsub|2>+\<cdots\>x<rsub|n>|)>>\<#FF0C\>\<#4E8E\>\<#662F\>

    <\equation*>
      <frac|1|n><around*|(|x<rsub|1>+x<rsub|2>+\<cdots\>x<rsub|n>|)>\<geqslant\><around*|(|x<rsub|1>x<rsub|2>\<cdots\>x<rsub|n>\<cdot\><frac|x<rsub|1>+x<rsub|2>+\<cdots\>+x<rsub|n>|n>|)><rsup|<frac|1|n+1>>
    </equation*>

    \<#6574\>\<#7406\>\<#5373\>\<#5F97\> <math|<frac|1|n><around*|(|x<rsub|1>+x<rsub|2>+\<cdots\>x<rsub|n>|)>\<geqslant\><around*|(|x<rsub|1>x<rsub|2>\<cdots\>x<rsub|n>|)><rsup|<frac|1|n>>>.
    \<#7531\>\<#4E8E\>\<#4EFB\>\<#610F\>\<#4E00\>\<#4E2A\>\<#6B63\>\<#6574\>\<#6570\>\<#90FD\>\<#53EF\>\<#4EE5\>\<#7531\>\<#67D0\>\<#4E2A\>
    2 \<#7684\>\<#5E42\>\<#5012\>\<#63A8\>\<#800C\>\<#6765\>\<#FF0C\>\<#6240\>\<#4EE5\>\<#4E0D\>\<#7B49\>\<#5F0F\>\<#5BF9\>\<#4E8E\>
    <math|\<geqslant\>2> \<#7684\>\<#6B63\>\<#6574\>\<#6570\>\<#90FD\>\<#6210\>\<#7ACB\>.

    \;
  </proof>

  <\example>
    (\<#67EF\>\<#897F\>\<#4E0D\>\<#7B49\>\<#5F0F\>) \<#8BBE\>
    <math|x<rsub|i><around*|(|i=1,2,\<ldots\>,n|)>> \<#548C\>
    <math|y<rsub|i><around*|(|i=1,2,\<ldots\>,n|)>>
    \<#662F\>\<#4E24\>\<#7EC4\>\<#5B9E\>\<#6570\>\<#FF0C\>\<#5219\>\<#6709\>

    <\equation*>
      <around*|(|<big|sum><rsub|i=1><rsup|n>x<rsub|i>y<rsub|i>|)><rsup|2>\<leqslant\><around*|(|<big|sum><rsub|i=1><rsup|n>x<rsub|i><rsup|2>|)><around*|(|<big|sum><rsub|i=1><rsup|n>y<rsub|i><rsup|2>|)>
    </equation*>

    \<#7B49\>\<#53F7\>\<#6210\>\<#7ACB\>\<#7684\>\<#5145\>\<#5206\>\<#5FC5\>\<#8981\>\<#6761\>\<#4EF6\>\<#662F\>\<#FF0C\>\<#5B58\>\<#5728\>\<#4E24\>\<#4E2A\>\<#4E0D\>\<#5168\>\<#4E3A\>\<#96F6\>\<#7684\>\<#5B9E\>\<#6570\>
    <math|\<lambda\>> \<#548C\> <math|\<mu\>>\<#FF0C\>\<#4F7F\>\<#5F97\>
    <math|\<lambda\>x<rsub|i>+\<mu\>y<rsub|i>=0> \<#5BF9\>
    <math|i=1,2,\<ldots\>,n> \<#540C\>\<#65F6\>\<#6210\>\<#7ACB\>.
  </example>

  <\proof>
    \<#6709\>

    <\eqnarray*>
      <tformat|<table|<row|<cell|<around*|(|<big|sum><rsub|i=1><rsup|n>x<rsub|i><rsup|2>|)><around*|(|<big|sum><rsub|i=1><rsup|n>y<rsub|i><rsup|2>|)>-<around*|(|<big|sum><rsub|i=1><rsup|n>x<rsub|i>y<rsub|i>|)><rsup|2>>|<cell|=>|<cell|<big|sum><rsub|i=1><rsup|n><big|sum><rsub|j=1><rsup|n>x<rsub|i><rsup|2>y<rsub|j><rsup|2>-<around*|(|<big|sum><rsub|i=1><rsup|n>x<rsub|i><rsup|2>y<rsub|i><rsup|2>+2<big|sum><rsub|i,j=1,i\<neq\>j><rsup|n>x<rsub|i>x<rsub|j>y<rsub|i>y<rsub|j>|)>>>|<row|<cell|>|<cell|=>|<cell|<big|sum><rsup|n><rsub|i,j=1,i\<neq\>j>x<rsub|i><rsup|2>y<rsub|j><rsup|2>-2<big|sum><rsub|i,j=1,i\<neq\>j><rsup|n>x<rsub|i>x<rsub|j>y<rsub|i>y<rsub|j>>>|<row|<cell|>|<cell|=>|<cell|<big|sum><rsub|i,j=1,i\<neq\>j><rsup|n><around*|(|x<rsub|i>y<rsub|j>-x<rsub|j>y<rsub|i>|)><rsup|2>>>>>
    </eqnarray*>

    \<#4E8E\>\<#662F\>\<#4E0D\>\<#7B49\>\<#5F0F\>\<#6210\>\<#7ACB\>.
  </proof>

  <\proof>
    \<#7531\>\<#5747\>\<#503C\>\<#4E0D\>\<#7B49\>\<#5F0F\>\<#FF0C\>\<#6709\>

    <\equation*>
      <frac|x<rsub|i><rsup|2>|<big|sum><rsub|i=1><rsup|n>x<rsub|i><rsup|2>>+<frac|y<rsub|i><rsup|2>|<big|sum><rsub|i=1><rsup|n>y<rsub|i><rsup|2>>\<geqslant\><frac|2<around*|\||x<rsub|i>y<rsub|i>|\|>|<sqrt|<around*|(|<big|sum><rsub|i=1><rsup|n>x<rsub|i><rsup|2>|)><around*|(|<big|sum><rsub|i=1><rsup|n>y<rsub|i><rsup|2>|)>>>
    </equation*>

    \<#5BF9\> <math|i=1,2,\<ldots\>,n> \<#90FD\>\<#6210\>\<#7ACB\>\<#FF0C\>\<#5C06\>\<#8FD9\>
    <math|n> \<#4E2A\>\<#4E0D\>\<#7B49\>\<#5F0F\>\<#5168\>\<#90E8\>\<#76F8\>\<#52A0\>\<#5373\>\<#5F97\>\<#67EF\>\<#897F\>\<#4E0D\>\<#7B49\>\<#5F0F\>.
  </proof>

  <\example>
    \<#8BBE\> <math|x<rsub|1>,x<rsub|2>,\<ldots\>,x<rsub|n>> \<#4E3A\>
    <math|n> \<#4E2A\>\<#6B63\>\<#6570\>\<#FF0C\>\<#6EE1\>\<#8DB3\>
    <math|x<rsub|1>x<rsub|2>\<cdots\>x<rsub|n>=1>, \<#6C42\>\<#8BC1\>:
    <math|x<rsub|1>+x<rsub|2>+\<cdots\>+x<rsub|n>\<geqslant\>n>.
  </example>

  <\proof>
    \<#7531\>\<#5747\>\<#503C\>\<#4E0D\>\<#7B49\>\<#5F0F\>\<#7ACB\>\<#5F97\>.
  </proof>

  <\proof>
    \<#7531\>\<#6570\>\<#5B66\>\<#5F52\>\<#7EB3\>\<#6CD5\>, <math|n=1>
    \<#65F6\>\<#7ED3\>\<#8BBA\>\<#663E\>\<#7136\>\<#6210\>\<#7ACB\>\<#FF0C\>\<#5047\>\<#5982\>\<#5BF9\>\<#4E8E\>
    <math|n> \<#4E2A\>\<#6B63\>\<#6570\>\<#7ED3\>\<#8BBA\>\<#6210\>\<#7ACB\>\<#FF0C\>\<#90A3\>\<#4E48\>\<#5BF9\>\<#4E8E\>
    <math|n+1> \<#4E2A\>\<#6570\>\<#7684\>\<#60C5\>\<#5F62\>\<#FF0C\>\<#6709\>
    <math|x<rsub|1>+x<rsub|2>+\<cdots\>+x<rsub|n-1>+x<rsub|n>x<rsub|n+1>\<geqslant\>n>.
    \<#6545\>\<#53EA\>\<#9700\>\<#8BC1\>\<#660E\>
    <math|x<rsub|n>+x<rsub|n+1>\<geqslant\>x<rsub|n>x<rsub|n+1>+1>\<#FF0C\>\<#5373\>
    <math|<around*|(|1-x<rsub|n>|)><around*|(|1-x<rsub|n+1>|)>\<leqslant\>0>,
    \<#521D\>\<#770B\>\<#8D77\>\<#6765\>\<#597D\>\<#50CF\>\<#8FD9\>\<#5E76\>\<#4E0D\>\<#4E00\>\<#5B9A\>\<#662F\>\<#6210\>\<#7ACB\>\<#7684\>\<#FF0C\>\<#4F46\>\<#662F\>\<#7531\>\<#4E8E\>\<#8FD9\>
    <math|n+1> \<#4E2A\>\<#6570\>\<#7684\>\<#4E58\>\<#79EF\>\<#4E3A\>1\<#FF0C\>\<#4E0D\>\<#53EF\>\<#80FD\>\<#4EFB\>\<#610F\>\<#4E24\>\<#4E2A\>\<#6570\>
    <math|x<rsub|i>> \<#548C\> <math|x<rsub|j>> \<#90FD\>\<#4F7F\>
    <math|<around*|(|1-x<rsub|i>|)><around*|(|1-x<rsub|j>|)>\<gtr\>0>
    \<#6210\>\<#7ACB\>\<#FF0C\>\<#6240\>\<#4EE5\>\<#5FC5\>\<#5B9A\>\<#5B58\>\<#5728\>\<#4E24\>\<#4E2A\>\<#6570\>
    <math|x<rsub|i>> \<#548C\> <math|x<rsub|j>> \<#4F7F\>\<#5F97\>
    <math|<around*|(|1-x<rsub|i>|)><around*|(|1-x<rsub|j>|)>\<leqslant\>0>\<#FF0C\>\<#4E8E\>\<#662F\>\<#6211\>\<#4EEC\>\<#628A\>\<#524D\>\<#8FF0\>\<#4E24\>\<#4E2A\>\<#6570\>\<#6346\>\<#7ED1\>\<#7684\>\<#8FC7\>\<#7A0B\>\<#65BD\>\<#52A0\>\<#5728\>\<#8FD9\>\<#4E24\>\<#4E2A\>\<#6570\>\<#4E0A\>\<#FF0C\>\<#5C31\>\<#53EF\>\<#4EE5\>\<#4F7F\>\<#5F52\>\<#7EB3\>\<#6CD5\>\<#7684\>\<#8FD9\>\<#4E2A\>\<#9012\>\<#5F52\>\<#7684\>\<#6B65\>\<#9AA4\>\<#6210\>\<#7ACB\>\<#FF0C\>\<#4ECE\>\<#800C\>\<#4E0D\>\<#7B49\>\<#5F0F\>\<#5F97\>\<#8BC1\>.
  </proof>

  \;

  <section|\<#6570\>\<#96C6\>\<#786E\>\<#754C\>\<#539F\>\<#7406\>>

  <section|\<#51FD\>\<#6570\>\<#6982\>\<#5FF5\>>

  <section|\<#5177\>\<#6709\>\<#67D0\>\<#4E9B\>\<#7279\>\<#6027\>\<#7684\>\<#51FD\>\<#6570\>>

  <chapter|\<#6570\>\<#5217\>\<#6781\>\<#9650\>>

  <section|\<#6570\>\<#5217\>\<#6781\>\<#9650\>\<#7684\>\<#6982\>\<#5FF5\>>

  <section|\<#6536\>\<#655B\>\<#6570\>\<#5217\>\<#7684\>\<#6027\>\<#8D28\>>

  <section|\<#6570\>\<#5217\>\<#6781\>\<#9650\>\<#5B58\>\<#5728\>\<#7684\>\<#6761\>\<#4EF6\>>

  \;
</body>

<\initial>
  <\collection>
    <associate|page-medium|paper>
  </collection>
</initial>

<\references>
  <\collection>
    <associate|auto-1|<tuple|1|7>>
    <associate|auto-2|<tuple|1.1|7>>
    <associate|auto-3|<tuple|1.2|8>>
    <associate|auto-4|<tuple|1.3|8>>
    <associate|auto-5|<tuple|1.4|8>>
    <associate|auto-6|<tuple|2|9>>
    <associate|auto-7|<tuple|2.1|9>>
    <associate|auto-8|<tuple|2.2|9>>
    <associate|auto-9|<tuple|2.3|9>>
  </collection>
</references>

<\auxiliary>
  <\collection>
    <\associate|toc>
      <vspace*|1fn><with|font-series|<quote|bold>|math-font-series|<quote|bold>|1<space|2spc>\<#5B9E\>\<#6570\>\<#96C6\>\<#4E0E\>\<#51FD\>\<#6570\>>
      <datoms|<macro|x|<repeat|<arg|x>|<with|font-series|medium|<with|font-size|1|<space|0.2fn>.<space|0.2fn>>>>>|<htab|5mm>>
      <no-break><pageref|auto-1><vspace|0.5fn>

      1.1<space|2spc>\<#5B9E\>\<#6570\> <datoms|<macro|x|<repeat|<arg|x>|<with|font-series|medium|<with|font-size|1|<space|0.2fn>.<space|0.2fn>>>>>|<htab|5mm>>
      <no-break><pageref|auto-2>

      1.2<space|2spc>\<#6570\>\<#96C6\>\<#786E\>\<#754C\>\<#539F\>\<#7406\>
      <datoms|<macro|x|<repeat|<arg|x>|<with|font-series|medium|<with|font-size|1|<space|0.2fn>.<space|0.2fn>>>>>|<htab|5mm>>
      <no-break><pageref|auto-3>

      1.3<space|2spc>\<#51FD\>\<#6570\>\<#6982\>\<#5FF5\>
      <datoms|<macro|x|<repeat|<arg|x>|<with|font-series|medium|<with|font-size|1|<space|0.2fn>.<space|0.2fn>>>>>|<htab|5mm>>
      <no-break><pageref|auto-4>

      1.4<space|2spc>\<#5177\>\<#6709\>\<#67D0\>\<#4E9B\>\<#7279\>\<#6027\>\<#7684\>\<#51FD\>\<#6570\>
      <datoms|<macro|x|<repeat|<arg|x>|<with|font-series|medium|<with|font-size|1|<space|0.2fn>.<space|0.2fn>>>>>|<htab|5mm>>
      <no-break><pageref|auto-5>

      <vspace*|1fn><with|font-series|<quote|bold>|math-font-series|<quote|bold>|2<space|2spc>\<#6570\>\<#5217\>\<#6781\>\<#9650\>>
      <datoms|<macro|x|<repeat|<arg|x>|<with|font-series|medium|<with|font-size|1|<space|0.2fn>.<space|0.2fn>>>>>|<htab|5mm>>
      <no-break><pageref|auto-6><vspace|0.5fn>

      2.1<space|2spc>\<#6570\>\<#5217\>\<#6781\>\<#9650\>\<#7684\>\<#6982\>\<#5FF5\>
      <datoms|<macro|x|<repeat|<arg|x>|<with|font-series|medium|<with|font-size|1|<space|0.2fn>.<space|0.2fn>>>>>|<htab|5mm>>
      <no-break><pageref|auto-7>

      2.2<space|2spc>\<#6536\>\<#655B\>\<#6570\>\<#5217\>\<#7684\>\<#6027\>\<#8D28\>
      <datoms|<macro|x|<repeat|<arg|x>|<with|font-series|medium|<with|font-size|1|<space|0.2fn>.<space|0.2fn>>>>>|<htab|5mm>>
      <no-break><pageref|auto-8>

      2.3<space|2spc>\<#6570\>\<#5217\>\<#6781\>\<#9650\>\<#5B58\>\<#5728\>\<#7684\>\<#6761\>\<#4EF6\>
      <datoms|<macro|x|<repeat|<arg|x>|<with|font-series|medium|<with|font-size|1|<space|0.2fn>.<space|0.2fn>>>>>|<htab|5mm>>
      <no-break><pageref|auto-9>
    </associate>
  </collection>
</auxiliary>